The Scenery Flow for Geometric Structures on the Torus: The Linear Setting

Abstract: Abstract. We define the scenery flow of the torus. The flow space is the union of all flat 2-dimensional tori of area 1 with a marked direction (or equivalently, on the union of all tori with a quadratic differential of norm 1). This is a 5-dimensional space, and the flow acts by following individual points under an extremal deformation of the quadratic differential. We define associated horocycle and translation flows; the latter preserve each torus and are the horizontal and vertical flows of the correspondi… Show more

“…The sequence (a k ) k≥1 turns out to be the sequence of partial quotients of the slope (defined as the density of the symbol 1), while (c k ) k≥1 is the sequence of digits in the arithmetic Ostrowski expansion of the intercept of the Sturmian sequence (see for instance [18,19,28,29,26,35,39,40] and the references in [10]). From this point of view, the characteristic (or standard ) Sturmian sequence of a particular slope is the one having c k = 0 for all k. This expansion of ω is just one of many possible expansions as an infinite composition of morphisms (see work of Arnoux [37], ArnouxFisher [5], Arnoux-Ferenczi-Hubert [4]). In each case these expansions are intimately linked to the Ostrowski numeration system.…”

Initial powers of Sturmian sequences

“…The sequence (a k ) k≥1 turns out to be the sequence of partial quotients of the slope (defined as the density of the symbol 1), while (c k ) k≥1 is the sequence of digits in the arithmetic Ostrowski expansion of the intercept of the Sturmian sequence (see for instance [18,19,28,29,26,35,39,40] and the references in [10]). From this point of view, the characteristic (or standard ) Sturmian sequence of a particular slope is the one having c k = 0 for all k. This expansion of ω is just one of many possible expansions as an infinite composition of morphisms (see work of Arnoux [37], ArnouxFisher [5], Arnoux-Ferenczi-Hubert [4]). In each case these expansions are intimately linked to the Ostrowski numeration system.…”

Initial powers of Sturmian sequences

“…Noting that a circle rotation is an exchange of two intervals, the proof follows as for other interval exchanges, as shown explicitly in [Fisa]; for the factor map, countably many pairs of points are identified (the endpoints of the Cantor set intervals). ⇤ For another proof, the factor map can be given an explicit arithmetical Ostrowsky formula as in [AF01] (there we use the dual substitution sequence). Related arithmetical formulas are studied in [GLT95] and a related Bratteli diagram (used for an a priori completely di↵erent purpose) appears in [ES80].…”

“…to irrational circle rotations, see Example 3) in the last section of [AF01]. We dedicate this paper to the memory of a very special person whom we have recently lost, Peter Bacas; he always pointed us toward the essentials, with such a warm heart and so much fire in his eyes.…”

Nonstationary Mixing and the Unique Ergodicity of Adic Transformations

“…For their metrical study, see [183,187]. For more on the connections between Ostrowski's numeration, word combinatorics, and particularly Sturmian words, see the survey [60], the sixth chapter in [272], and the very complete description of the scenery flow given in [31]. In the…”

Dynamical directions in numeration